2.1.

Implementation of the FZP on the DMD

The experimental design involves a laser directed toward a DMD, with an FZP pattern being displayed. The aim of the laser detection system is to characterize laser wavelengths by measuring the size of the beam at a constant distance from the DMD while varying the first order focal length of the FZP lens. This wavelength characterization method is similar to Ref. 18. To redirect the incoming laser light, the diffractive properties of the DMD are used: transparent zones are composed of the “on” state mirrors and focus the light toward the “on” state direction at $+12\mathrm{deg}$, whereas the opaque zones are composed of the “off” state mirrors and focus the light toward the “off” state direction at $-12\mathrm{deg}$. A conventional FZP is a set of concentric rings of constant area that reduce in thickness as they get further from the center, and the focal length of the FZP is given by

Wavefronts or surfaces can be represented by a set of orthogonal Zernike modes, which correspond to classical wavefront aberrations. The modes are constructed using the normalized radius ($\rho$) and the Azimuthal angle ($\theta$). Typically, Zernike modes for a circular geometry are used as this usually corresponds to the beam geometry. However, in the case of the aperture geometry being non-circular, the orthogonal Zernike modes take on a modified form. As the DMD has a rectangular geometry, we make use of the rectangular Zernike modes, ²⁷ and because this is an unusual approach, the mode equations are shown in Table 1.

Table 1

Rectangular Zernike polynomials in polar coordinates, where “a” correspond to the conversion factor from circular surface to rectangular surface; a=0.8 here.

In this work, we refer to the individual modes with a single index representation as given in the first column. Other works often refer to modes with a dual index representation, $Z_m^n$, where $n$ is the radial frequency and $m$ is the angular frequency, which are given in the second column for completeness. The parameter $a$ is the ratio of the longest axis to the diagonal length of the rectangular aperture, which in the case of the DMD used in this work is $a=0.8$. The FZP pattern is entirely equivalent to the focus (sometimes called defocus) Zernike mode ($Z_4$). Here, FZP is used to show that the focus term is the predominant mode.

To write the FZP pattern on the DMD, the defocus term of the Zernike polynomials is used and is simplified to

if $\sin (Z)>0$ then amplitude = 1, else = 0.  

Figure 1 shows an FZP pattern written on the DMD. The FZP is written using only the defocus ($Z_4$) term of the Zernike series; the rest of the Zernike terms are used to correct optical aberrations inherent in the system—some from the DMD and some from the optical system used to introduce light to the DMD. Finally, a camera is used to analyze the characteristics of the beam.

Fig. 1

Photograph of a FZP written onto the array of micromirrors (central rectangular region). The whole device is rotated by 45 deg, so the micromirrors flip about a vertical axis, thus keeping the reflected beams in a horizontal plane.

With a fixed DMD-to-camera distance, the focal length is constant, and to correctly focus different wavelengths, the number of zones present within the DMD size varies. The wavefront curvature is the same for all focused wavelengths, and the number of zones ($n$) is given by

Expanding out the defocus term, we write

4.1.

Step 1: Scan Focus Amplitude

In this first step, the diffracted beam from the DMD is coarsely focused onto the camera sensor plane. Changing the amplitude of Zernike mode $R_4$ changes the amount of diffracted wavefront curvature; thus higher values focus closer to the DMD. Progressively changing the amplitude $R_4$ scans the focal position, and we seek to find the minimum spot size seen by the camera. The tilting mirrors produce a focus away from the optical axis, and this results in significant amounts of astigmatism.

From the camera perspective, the widths of the astigmatic beam in the vertical and horizontal directions show opposite behavior before and after the focal point—the focus is a line that transitions between vertical and horizontal orientation. We look for the “circle of least confusion,” which occurs between the astigmatic line foci and is the point at which the horizontal and vertical projected widths are equal. To make the width measurements, the camera is saturated (higher exposure time so that most of the pixels from the beam produce at a value of 255), and an intensity threshold is applied on the camera image to let only intensity pixels over a value of 245. In Fig. 3(a), an example of an oversaturated beam and the vertical and horizontal widths measured from the beam are shown.

Fig. 3

(a) Horizontal and vertical projections of the coarsely focused beam on the camera (pixel $\text{size}=4.65\mu \mathrm{m}$). (b) Variation of horizontal and vertical beam widths as a function of the defocus for a laser wavelength.

The focal length (via the defocus amplitude) is now varied, and the change in the horizontal and vertical widths is recorded for each defocus amplitude setting. The results are shown in Fig. 3(b) with the pre-correction widths showing minima at different values due to the strong astigmatism in the system. An intersection between the vertical and horizontal projections can be seen, and this gives an estimation of the focus. For the HeNe laser, the focus on the camera is estimated to be for a defocus value of $R_4=23.00\pm 0.01$. This uncertainty is taken as the minimal step-size of defocus for which a distinguishable change in the beam is seen.

4.2.

Step 2: Scan Zernike Mode Amplitudes

Once the defocus is set, the Zernike modes $Z_5$ to $Z_{15}$ can be determined to correct the beam aberrations (note tip and tilt merely offset the beam and are not varied). To assess the image quality by maximizing the peak intensity of the focused spot, a short exposure time is used. It is important to ensure that no saturation occurs. Figure 4 shows the peak intensities and the related amplitudes for each of the Zernike modes. The peak intensity corresponds to the value after the Zernike mode correction is applied.

Fig. 4

Amplitude of $R_5$ to $R_{15}$ Zernike modes for which the maximum intensity was found for the wavelength $\lambda =632.8\mathrm{nm}$.

As expected, the vertical and horizontal astigmatism terms are the strongest, with the horizontal astigmatism being more important. This is to be expected as the DMD is off-axis in the horizontal plane. Most of the other modes have a smaller influence in the wavefront correction; they collectively contribute an 11% increase after the astigmatism is corrected.

4.3.

Step 3: Revisit Astigmatism

The third step improves the determination of the correct values of $R_5$ and $R_6$ amplitudes (horizontal and vertical astigmatisms). In the previous step, $R_5$ and $R_6$ were found by looking at the maximum intensity. However, the peak intensity can be misleading as we must also ensure that the beam focus is a sensible shape—but it does locate the range of values for $R_5$ and $R_6$ that improve the focal length shape on the camera. To evaluate the astigmatism correction, we also seek to ensure that the shape of the focused spot is correct. A Gaussian fit is applied along the vertical and horizontal axes from the center of the beam [see Fig. 5(a) with a Gaussian applied on the vertical axis]. The standard deviations from these two Gaussian fits are then used to estimate the beam shape. When the widths are equal, the beam is circular.

Fig. 5

(a) Gaussian fit from the center of the beam ($\text{pixel size}=4.65\mu \mathrm{m}$). (b) Variation of the horizontal astigmatism amplitude $R_5$ while the vertical astigmatism amplitude $R_6$ is fixed (left), evolution of the vertical and horizontal standard deviations as a function of the different $R_5/R_6$ pairs (right). (c) Variation of the vertical astigmatism amplitude $R_6$ while the horizontal astigmatism amplitude $R_5$ is fixed (left), evolution of the vertical and horizontal standard deviations as a function of the different $R_5/R_6$ pairs (right).

For this step, the $R_5$ and $R_6$ amplitudes are first taken from the values of step 2. The $R_5$ amplitude is then varied with the $R_6$ amplitude being fixed, and the pair with the smallest difference between the horizontal and vertical standard deviations is taken [see Fig. 5(b)]. Then, keeping the minimum $R_5$ amplitude, the $R_6$ amplitude is varied until the smallest difference between the standard deviations is found again [see Fig. 5(c)], which indicates a circular beam. For both graphs, the standard deviation in pixels is converted to the beam radius in microns. In this case, the value of $R_6$ has two possible pairs as they both have the same vertical and horizontal spot radius difference. To determine its best value, the highest beam intensity was taken into consideration. Thus, the most fitting pair is for $R_5=3.60\pm 0.01$ and $R_6=1.00\pm 0.01$.

The amplitudes of all of the Zernike modes are now defined to correct the astigmatism and to define the focal point on the camera. Images of the beam before and after correction are shown in Fig. 6. The result is a greater than 10 times improvement in the focus spot size after correction.

Fig. 6

Initial beam and beam (inverted for clarity) after correction at the focal point for the wavelength $\lambda =632.8\mathrm{nm}$.

5.1.

Wavelength as a Function of Defocus

Finally, the behavior of the beam after correction of the optical aberrations is investigated by measuring the focused beam spot size as a function of the defocus amplitude. Figure 7 shows the RMS spot width, defined as $\frac{1}{2}\sqrt{W{x}^2+W{y}^2}$ with $W_x$ and $W_y$ being the horizontal and vertical spot widths that are derived from the horizontal standard deviation ${\sigma }_x$ and the vertical standard deviation ${\sigma }_y$ ($W_{x/y}=2{\sigma }_{x/y}pc$ with $pc=4.65\mu \mathrm{m}$, the size of the camera pixel). The “best” focus is taken to be the smallest spot size, which is at the bottom of the parabola.

Fig. 7

Average spot width versus defocus value for a wavelength of 632.8 nm.

The focal point is determined to be at a defocus value of $R_4=23.05\pm 0.01$ at a wavelength $\lambda =632.8\mathrm{nm}$.

Figure 7 shows a parabola, symmetrical around the focal point, which indicates a correction of the astigmatism if compared with the previous beam evolution (see Fig. 3).

From Fig. 7, the beam waist radius is determined to be $44\pm 0.1\mu \mathrm{m}$. This uncertainty is calculated based on different measurements: the vertical and horizontal beam waists and their respective inaccuracy as well as the camera pixel size. The theoretical beam waist radius, well known from Gaussian beam optics, is given by

The focal length, $f$, is the DMD to camera distance ($54\pm 0.2\mathrm{cm}$), and $r_{\text{edge}}$ is the smallest radial dimension to the edge of the DMD. The experimental beam waist radius is 2.1 times bigger than the diffraction limited beam waist for a wavelength of 632.8 nm. To examine the consistency of these results, the experiment is reproduced at different DMD-to-camera distances of $30\pm 0.2\mathrm{cm}$ and $76\pm 0.2\mathrm{cm}$. This resulted in 2.5 and 2.7 times the diffraction limited beam waist, respectively. The results are consistent over the different focal lengths. However, based on our calculation, compared with the 2018 paper,¹⁸ which measured six times the diffraction limited beam waist for a focal length of 25 cm, these results show that we reproduced and improved the experiment by correcting some of the optical aberrations.

5.2.

Beam Size and Defocus Amplitude Comparison at Multiple Wavelengths

A graph showing the average measured beam radius as a function of the defocus amplitude for four laser wavelengths is shown in Fig. 8. These measurements were all made with a DMD-to-camera distance of 46 cm. Each of the four wavelengths is clearly distinguished. The blue laser spot size is notably larger than the other wavelengths—$73\mu \mathrm{m}$ compared with $34\mu \mathrm{m}$ at 632 nm. This occurs for two reasons: first, the blue laser has a poor spectral bandwidth with a strong temperature dependency, and as such, this results in a broadening of the focus spot size. Second, the single mode fiber used for light delivery are multimode at 405 nm, which may also broaden the focal spot size. This also accounts for the larger uncertainty measurements at each defocus amplitude for the blue laser compared with the other lasers.

Fig. 8

Evolution of the beam size as a function of the defocus at each laser wavelength: 405 nm, 532, 633, and 760 nm.

A second order polynomial fit is applied to the data for each wavelength plot of Fig. 8. From this, the amplitude representing the minimum spot size is determined. A comparison of experimental and theoretical values of the beam waist, as well as the corresponding defocus value, is given in Table 2.

5.3.

Evolution of Beam Waist with Wavelength

The evolution of the beam waist as a function of the wavelength can be analyzed based on Table 3. If we compare the diffraction limited beam waist with the experimental beam waist, the 633 and 760 nm lasers are unsurprisingly smaller; their experimental beam waist is around twice their diffraction limited beam waist. The 532 and 405 nm lasers are three and six times their diffraction size, respectively. The larger spot size is a consequence of the relatively wide spectral bandwidths of each laser. The DMD behaves like a diffraction grating, thus there is a lateral shift of the focal spot on the camera sensor for a change in wavelength. The source spectral bandwidth results in a lateral shift that is far more significant than the transverse focal shift. This lateral shift is given by $\mathrm{\Delta }x=m\mathrm{\Delta }\lambda f/d$, where $m$ is the grating order, $\mathrm{\Delta }\lambda$ is the spectral bandwidth, $f$ is the focal length, and $d$ is the mirror spacing.²⁹ Given that the narrow bandwidth sources present a spot that is approximately twice the diffraction limit, we can apply the same estimation to the broader spectral sources and estimate the source spectral bandwidth. The 405 nm source bandwidth is estimated at 0.2 nm, and the 532 nm source is estimated at 0.1 nm.

Table 3

Comparison of experimental and theoretical values of defocus value and beam waist with wavelengths at 405, 532, 632.8, and 760 nm at a focal length of 46 cm.

5.4.

Wavelength Characterization and Resolution

The evolution of the defocus amplitude at the best focus as a function of wavelength is shown in Fig. 9. The expected $R_4$ values as calculated using Eq. (5) are also shown. This shows good agreement for the longer wavelengths but not for the 405 nm laser. This may be due to the optical fiber not being single mode for this wavelength, with higher order fiber modes having higher divergence and requiring additional defocus amplitude.

Fig. 9

Defocus value as a function of wavelength.

A second order polynomial is used to fit the set of measured $R_4$ data. This characterization implies that, for an unknown wavelength, once the defocus amplitude for minimum spot size is found from the defocus scan, the input wavelength can be determined. From this graph, the system wavelength resolution can be extracted. The confidence interval of the defocus value is estimated from the confidence interval of the beam waist, which itself is measured on LabView from the variation of the standard deviation associated with the horizontal and vertical Gaussian fits. Based on the confidence interval of the defocus value, the confidence interval for each wavelength can be estimated. These accuracy measurements are given in Table 4.

Table 4

Wavelength resolutions of the DMD based detection system with rectangular Zernike polynomials.

Overall, the relative wavelength resolution is found to be at around $5\times {10}^{-3}$, which is comparable to most of the wavelength determination systems. Indeed, previous laser detection systems based on diffraction gratings have shown absolute resolution of 10 nm,¹¹ whereas here we show a resolution of 3 nm.

We must, however, comment on the results of Ref. 18 attained using the DMD with an FZP pattern. They claim a relative resolution of ${10}^{-5}$ with an HeNe laser. They are in fact presenting their measurement of precision of a known wavelength, based on the repetition of measurements and the standard deviation associated with them. In the context of laser detection, the most useful information is the accuracy with which an unknown wavelength could be determined, which in our work is determined from the precision of the minima of the polynomial fits for all wavelengths.